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What is the answers for investigation 2 homework on comparing and scaling?
For question 1 the answer is the small table because you have to divide the number of tables by the number of pizzas. For answer 2 the answer is no becuse he was scaling down and simplfying the ratios to 9 and 5. The rest I do not know so good luck.
What is an equation comparing 2 ratios called?
proportion
How can you use ratios of adjacent sides to prove if two rectangles are similar?
You can use ratios of adjacent sides to prove if two rectangles are similar by comparing to see if the ratios are the same
Percent ratio proportion decimals inverse comparing ratios convrting rates rate give the meaning and answer?
give the meaning and answer of kinds of fraction percent ratio proportion decimals inverse comparing ratios converting rartios rate
What are equivlent ratios?
when a number of ratios give the same answer after solving the ratios the ratios are said to be equivalent ratios
What is the answers for investigation 2 homework on comparing and scaling?
For question 1 the answer is the small table because you have to divide the number of tables by the number of pizzas. For answer 2 the answer is no becuse he was scaling down and simplfying the ratios to 9 and 5. The rest I do not know so good luck.
What is the definitions of scaling and ratios?
Scaling- when you multiply or divide equivalent fractions
What is an equation comparing 2 ratios called?
proportion
The product of numbers on the diagonal when comparing two ratios?
cross product.
How can you use ratios of adjacent sides to prove if two rectangles are similar?
You can use ratios of adjacent sides to prove if two rectangles are similar by comparing to see if the ratios are the same
Percent ratio proportion decimals inverse comparing ratios convrting rates rate give the meaning and answer?
give the meaning and answer of kinds of fraction percent ratio proportion decimals inverse comparing ratios converting rartios rate
Why do proportions work?
Proportions work because they show the relationship between different quantities by comparing them using fractions or ratios. They are useful for scaling up or down values while maintaining their relative sizes. This makes proportions a powerful tool for solving a wide range of problems in mathematics and real-life situations.
Are useful for comparing amounts or quantities?
Ratios are useful for comparing amounts or quantities because they provide a simplified way to express the relationship between two values. By dividing one value by another, ratios can help determine the relative size or proportion of different entities or quantities.
How are proportions useful in the real world?
Proportions are useful in the real world for scaling, estimating, and comparing quantities. They allow us to make predictions and solve problems involving ratios of different amounts. For example, proportions are used in cooking recipes to scale ingredients, in finance to calculate interest rates, and in design to maintain balance and harmony.
What ratios for 18?
It seems like your question is incomplete. Ratios typically involve comparing two quantities using division. If you could provide more context or specify what you would like to know about ratios for the number 18, I would be happy to provide a detailed explanation.
Can ratios have decimals?
Oh, dude, ratios are like the cool kids of math, they don't really care if they have decimals or not. So, yeah, ratios can totally have decimals! It's like saying, "Hey, I'm a ratio, I can rock a decimal if I want to." Math can be chill like that sometimes.
What are the key factors to consider when comparing bike gear ratios for optimal performance?
When comparing bike gear ratios for optimal performance, key factors to consider include the number of teeth on the front and rear gears, the gear range, the terrain you will be riding on, and your own fitness level and riding style. These factors will affect your ability to pedal efficiently and maintain a comfortable cadence while riding.
